Invariant laminations for irreducible automorphisms of free groups

Abstract

For every atoroidal iwip automorphism φ of FN (i.e. the analogue of a pseudo-Anosov mapping class) it is shown that the algebraic lamination dual to the forward limit tree T+(φ) is obtained as "diagonal closure" of the support of the backward limit current μ-(φ). This diagonal closure is obtained through a finite procedure in analogy to adding diagonal leaves from the complementary components to the stable lamination of a pseudo-Anosov homeomorphism. We also give several new characterizations as well as a structure theorem for the dual lamination of T+(φ), in terms of Bestvina-Feighn-Handel's "stable lamination" associated to φ.